@book{Stratton1941Electromagnetic,
  title={Electromagnetic theory},
  author={Stratton, J.A.},
  lccn={41002180},
  series={International series in pure and applied physics},
  url={http://books.google.com/books?id=LiZRAAAAMAAJ},
  year={1941},
  publisher={McGraw-Hill book company, inc.}
}

@book{Griffiths1999Electrodynamics,
  title={Introduction to electrodynamics},
  author={Griffiths, D.J.},
  isbn={9780138053260},
  lccn={98050525},
  url={http://books.google.com/books?id=M8XvAAAAMAAJ},
  year={1999},
  publisher={Prentice Hall}
}

@article{Johnson72OpticalConstants,
  title = {Optical Constants of the Noble Metals},
  author = {Johnson, P. B. and Christy, R. W.},
  journal = {Phys. Rev. B},
  volume = {6},
  issue = {12},
  pages = {4370--4379},
  year = {1972},
  month = {Dec},
  doi = {10.1103/PhysRevB.6.4370},
  url = {http://link.aps.org/doi/10.1103/PhysRevB.6.4370},
  publisher = {American Physical Society}
}

@book{Bohren83Absorption,
  title={Absorption and scattering of light by small particles},
  author={Craig F. Bohren and Huffman, D.R.},
  isbn={9780471293408},
  lccn={lc82020312},
  series={Wiley science paperback series},
  url={http://books.google.com/books?id=S1RCZ8BjgN0C},
  year={1983},
  publisher={Wiley}
}

@article{Xu:95, 
author = {Yu-lin Xu}, 
journal = {Appl. Opt.}, 
keywords = {},
number = {21}, 
pages = {4573--4588}, 
publisher = {OSA},
title = {Electromagnetic scattering by an aggregate of spheres}, 
volume = {34}, 
month = {Jul},
year = {1995},
url = {http://ao.osa.org/abstract.cfm?URI=ao-34-21-4573},
doi = {10.1364/AO.34.004573},
abstract = {We present a comprehensive solution to the classical problem of
                  electromagnetic scattering by aggregates of an arbitrary
                  number of arbitrarily configured spheres that are
                  isotropic and homogeneous but may be of different size
                  and composition. The profile of incident electromagnetic
                  waves is arbitrary. The analysis is based on the
                  framework of the Mie theory for a single sphere and the
                  existing addition theorems for spherical vector wave
                  functions. The classic Mie theory is
                  generalized. Applying the extended Mie theory to all the
                  spherical constituents in an aggregate simultaneously
                  leads to a set of coupled linear equations in the unknown
                  interactive coefficients. We propose an asymptotic
                  iteration technique to solve for these coefficients. The
                  total scattered field of the entire ensemble is
                  constructed with the interactive scattering coefficients
                  by the use of the translational addition theorem a second
                  time. Rigorous analytical expressions are derived for the
                  cross sections in a general case and for all the elements
                  of the amplitude-scattering matrix in a special case of a
                  plane-incident wave propagating along the z axis. As an
                  illustration, we present some of our preliminary
                  numerical results and compare them with previously
                  published laboratory scattering measurements.},
}


